2D Ising model: correlation functions at criticality via Riemann-type boundary value problems
Abstract
In this note we overview recent convergence results for correlations in the critical planar nearest-neighbor Ising model. We start with a short discussion of the combinatorics of the model and a definition of fermionic and spinor observables. After that, we illustrate our approach to spin correlations by a derivation of two classical explicit formulae in the infinite-volume limit. Then we describe the convergence results (as the mesh size tends to zero, in arbitrary planar domains) for fermionic correlators, energy-density and spin expectations. Finally, we discuss scaling limits of mixed correlators involving spins, disorders and fermions, and the classical fusion rules for them.
Cite
@article{arxiv.1605.09035,
title = {2D Ising model: correlation functions at criticality via Riemann-type boundary value problems},
author = {Dmitry Chelkak},
journal= {arXiv preprint arXiv:1605.09035},
year = {2017}
}
Comments
20 pages, Proceedings of the 7ECM. Tiny changes in the notation/normalizations to keep the paper consistent with other texts